Interactions: In each case, there is a [conservative|conservative force] gravitational interaction between the block and the earth which will provide a gravitational potential energy. In the final two cases (the ramp and the track) the block is also subject to a [non-conservative] normal force from the surface upon which it travels. In each case, however, the normal force does no work, since it is always perpendicular to the direction of the block's travel (the block is always moving parallel to the surface and the normal force is, by definition, perpendicular to the surface). Thus, in all three cases, the non-conservative work is zero.
Model: [Mechanical Energy and Non-Conservative Work].
Approach: Since the non-conservative work is zero, the mechanical energy will be constant:
{latex}\begin{large}\[ E_{i} = E_{f}\]\end{large}{latex}
In each case, the [initial-state final-state diagram] and [energy bar graphs|energy bar graph] will
be:
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